Solving Nonlinear Absolute Value Equations

Aris Daniilidis (VADOR); Mounir Haddou (IRMAR); Olivier Ley (IRMAR); Phi Hoang Tran (IRMAR); Tri Minh Le (VADOR)

arxiv: 2402.16439 · v3 · submitted 2024-02-26 · 🧮 math.OC

Solving Nonlinear Absolute Value Equations

Aris Daniilidis (VADOR) , Mounir Haddou (IRMAR) , Tri Minh Le (VADOR) , Olivier Ley (IRMAR) , Phi Hoang Tran (IRMAR) This is my paper

Pith reviewed 2026-05-24 04:18 UTC · model grok-4.3

classification 🧮 math.OC

keywords nonlinear absolute value equationsnonlinear complementarity problemssmoothing regularizationLojasiewicz inequalityerror boundsoptimizationdifferential equations

0 comments

The pith

Nonlinear absolute value equations can be reformulated as nonlinear complementarity problems and solved using smoothing regularization under mild assumptions.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper shows that problems naturally expressed as nonlinear absolute value equations can be rewritten as nonlinear complementarity problems. These reformulated problems are then solved numerically by smoothing regularization techniques. The approach is presented as the first direct numerical treatment of such equations. A common technical assumption in smoothing methods is proved equivalent to the classical Łojasiewicz inequality at infinity. Error estimates from complementarity solvers are extended to the original equations under weaker conditions, with examples in asymmetric ridge optimization and nonlinear ordinary differential equations.

Core claim

Nonlinear absolute value equations can be reformulated as nonlinear complementarity problems and efficiently solved using smoothing regularization techniques under mild assumptions. The technical assumption commonly used in smoothing is equivalent to the Łojasiewicz inequality at infinity. Established error estimates for NCP solvers extend to NAVE problems under weaker assumptions.

What carries the argument

Reformulation of nonlinear absolute value equations into nonlinear complementarity problems, solved via smoothing regularization.

If this is right

Several problems represented as nonlinear absolute value equations become solvable as nonlinear complementarity problems.
Error bounds for nonlinear complementarity problem solvers extend to nonlinear absolute value equations under weaker assumptions.
The method applies to asymmetric ridge optimization problems.
The method applies to nonlinear ordinary differential equations.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

Existing numerical solvers for complementarity problems could now be applied directly to a new class of absolute-value problems.
The equivalence proof may allow similar smoothing techniques to be justified in other contexts where the Łojasiewicz inequality appears.
Practical performance on ridge optimization suggests the reformulation could reduce computational cost in related absolute-value models.

Load-bearing premise

The reformulation of nonlinear absolute value equations into nonlinear complementarity problems is valid and the smoothing regularization applies under the mild assumptions stated.

What would settle it

A concrete nonlinear absolute value equation where the reformulation to a complementarity problem fails, or where the smoothing method does not converge under the stated mild assumptions, would disprove the central claim.

Figures

Figures reproduced from arXiv: 2402.16439 by Aris Daniilidis (VADOR), Mounir Haddou (IRMAR), Olivier Ley (IRMAR), Phi Hoang Tran (IRMAR), Tri Minh Le (VADOR).

**Figure 1.** Figure 1: Problem in dimension m = 20 and d = 40. 3.2 Nonlinear ordinary differential equations A NAVE problem also naturally arises when we deal with a discretization of a nonlinear ordinary differential equation (ODE, for short) involving rough velocity, for example ˙γ(t) = p |γ(t)| as well as an ODE of the form Φ(X(2k) , X(2k−1) , . . . , X˙ ) = |X| In this subsection we provide two examples (one being a stiff OD… view at source ↗

**Figure 2.** Figure 2: (b), we apply difference mesh sizes in the same time interval [PITH_FULL_IMAGE:figures/full_fig_p013_2.png] view at source ↗

**Figure 3.** Figure 3: Convergence rate O(h) for a boundary value problem Example 3.2. For a continuous function f : [0, +∞) → R, we consider an ODE ( x¨ + arctan(x) − |x| = f(t), t > 0, x(0) = x0 ∈ R, x˙(0) = 0. (3.8) Using a similar discretization as in Example 3.1, the unknown variable x ≈ x(t) solves a NAVE problem as follows Ax + arctan(x) − |x| = b, (3.9) where the matrix A is determined as in Example 3.1 and the vector b … view at source ↗

**Figure 4.** Figure 4: Solving equation 3.8. 3.3 Comparison of methods for NAVE Instead of smoothing procedure considered in Section 2, one can solve a NCP via other numerical methods. In this subsection we give examples to compare the efficiency of four methods • Newton–like method with smoothing functions θ1 and θ2; • approximating by Soft–Max function, in which the main idea is to approximate the complementarity condition vi… view at source ↗

**Figure 5.** Figure 5: Performance time. 4 Conclusion and discussion In this work, we applied smoothing techniques commonly used for Nonlinear Complementarity Problems (NCP) to Nonlinear Absolute Value Equations (NAVE). We first showed that a NAVE can be formulated as a NCP with an implicitly known corresponding mapping. We then established that a NAVE can be effectively addressed under a mild direct assumption on the NAVE funct… view at source ↗

read the original abstract

In this work, we show that several problems naturally represented as Nonlinear Absolute Value Equations (NAVE) can be reformulated as Nonlinear Complementarity Problems (NCP) and efficiently solved using smoothing regularization techniques under mild assumptions. As far as we know, this is the first numerical approach that directly deals with NAVE. We also identify a technical assumption commonly utilized in smoothing techniques and prove its equivalence to a classical __ojasiewicz inequality at infinity, validating its non-restrictive nature. Furthermore, we extend established error estimates for NCP solvers to derive error bounds for NAVE problems under weaker assumptions. We illustrate the effectiveness of our approach through applications including asymmetric ridge optimization and nonlinear ordinary differential equations.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper's main contribution is a reformulation of NAVE into NCP that enables smoothing solvers, plus an equivalence proof and extended error bounds under weaker conditions.

read the letter

The punchline is that this work gives the first direct numerical route for nonlinear absolute value equations by turning them into nonlinear complementarity problems and then applying smoothing regularization. They also prove that a standard technical assumption in smoothing matches the classical Łojasiewicz inequality at infinity, and they carry over existing NCP error bounds to the NAVE case with milder hypotheses. The abstract is explicit that this is new and that the assumptions are not restrictive. That equivalence step is useful because it removes one common objection to smoothing methods. The applications to asymmetric ridge optimization and nonlinear ODEs are concrete enough to show where the reformulation might actually be used. The argument structure looks internally consistent: the reformulation preserves solutions, the smoothing applies under the stated conditions, and the error bounds follow from the NCP results. No circularity or hidden fitting is visible. The main soft spot is that the abstract alone does not let us check the length or tightness of the new error bounds or how the method scales on the examples. If the full proofs hold up, this is a modest but honest step forward in the math.OC literature on nonsmooth equations. It is aimed at researchers already working with complementarity problems or nonsmooth optimization who need a direct handle on absolute-value type equations. I would send it to peer review because the claims are specific, the novelty is stated clearly, and the technical steps are checkable by specialists in the area.

Referee Report

0 major / 2 minor

Summary. The paper claims that Nonlinear Absolute Value Equations (NAVE) can be reformulated as Nonlinear Complementarity Problems (NCP) and solved via smoothing regularization under mild assumptions, providing the first direct numerical method for NAVE. It proves equivalence between a standard smoothing assumption and the classical Łojasiewicz inequality at infinity, extends NCP error bounds to NAVE under weaker conditions, and demonstrates the approach on asymmetric ridge optimization and nonlinear ODEs.

Significance. If the reformulation preserves solutions and the equivalence holds, the work supplies a practical numerical framework for NAVE instances that arise in optimization and differential equations, together with validated assumptions and extended error bounds. The applications supply concrete evidence of utility.

minor comments (2)

[Abstract] Abstract: the placeholder '__ojasiewicz' should be corrected to 'Łojasiewicz'.
[Abstract] Abstract: the phrase 'mild assumptions' is used without enumeration; a parenthetical list of the key conditions would improve readability.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary, significance assessment, and recommendation of minor revision. No major comments appear in the provided report, so we have no point-by-point responses to prepare. We will incorporate any minor suggestions during revision.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper's core contribution is a reformulation of NAVE into NCP, followed by smoothing regularization whose key assumption is proven equivalent to the classical Łojasiewicz inequality at infinity, plus extension of existing NCP error bounds to NAVE under weaker conditions. These steps consist of explicit mathematical equivalences and proofs that stand independently of the target result; no parameter is fitted and then renamed as a prediction, no self-citation chain bears the central claim, and no ansatz or uniqueness statement is smuggled in via prior work by the same authors. The derivation chain is therefore self-contained against external benchmarks.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The central claim rests on the validity of the NAVE-to-NCP reformulation under mild assumptions and the equivalence of the smoothing assumption to the Łojasiewicz inequality; these are presented as proven in the paper rather than fitted or invented ad hoc.

axioms (1)

domain assumption The technical assumption commonly used in smoothing techniques for NCP is equivalent to the classical Łojasiewicz inequality at infinity
Identified and proven equivalent in the paper per the abstract, validating its non-restrictive nature.

pith-pipeline@v0.9.0 · 5661 in / 1187 out tokens · 21792 ms · 2026-05-24T04:18:17.277060+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

We first show that ... nonlinear absolute value equations can also be associated to nonlinear complementarity problems ... smoothing technique proposed in [10] ... technical assumption ... equivalent to ... Łojasiewicz inequality at infinity (Theorem 2.8)
IndisputableMonolith/Foundation/BranchSelection.lean branch_selection unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

If F − I is a P0-map, then ... z = H(y) ... 0 ≤ y ⊥ H(y) ≥ 0

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

37 extracted references · 37 canonical work pages

[1]

Abdallah, M

L. Abdallah, M. Haddou, T. Migot, Solving absolute value equation using complemen- tarity and smoothing functions. J. Comput. Appl. Math. 327 (2018), 196–207

work page 2018
[2]

J. H. Alcantara, J-S. Chen. A new class of neural networks for NCPs using smooth per- turbations of the natural residual function, J. Comput. Appl. Math. 407 (2022), Paper No. 114092, 22 pp

work page 2022
[3]

J. H. Alcantara, J.-S. Chen, M. K. Tam,Method of alternating projections for the general absolute value equation. J. Fixed Point Theory Appl. 25 (2023), Paper No. 39, 38 pp. 17

work page 2023
[4]

Ben Gharbia J.C

I. Ben Gharbia J.C. Gilbert, Nonconvergence of the plain Newton-min algorithm for linear complementarity problems with a P-matrix, Mathematical Programming 134 (2012), 349–364

work page 2012
[5]

J. Y. Bello Cruz, O. P. Ferreira, L. F. Prudente, On the global convergence of the inexact semi-smooth Newton method for absolute value equation, Comput. Optim. Appl. 65 (2016), 93–108

work page 2016
[6]

Coste , An Introduction to o-minimal Geometry , Instituti Editoriali e Poligrafici Inter- nazionali, Pisa (2000)

M. Coste , An Introduction to o-minimal Geometry , Instituti Editoriali e Poligrafici Inter- nazionali, Pisa (2000)

work page 2000
[7]

Dacunto, V

D. Dacunto, V. Grandjean, A gradient inequality at infinity for tame functions, Rev. Mat. Complut. 18 (2005), 493–501

work page 2005
[8]

Fiedler, V

M. Fiedler, V. Pt ´ak, On matrices with nonpositive off-digagonal elements and positive principal minors, Czech. Math. J. 12 (1962), 382–400

work page 1962
[9]

Hu and Z.-H

S.-L. Hu and Z.-H. Huang, A note on absolute value equations, Optim. Lett. 4 (2010), 417–424

work page 2010
[10]

Haddou, P

M. Haddou, P. Maheux, Smoothing methods for nonlinear complementarity problems, J. Optim. Theory Appl. 160 (2014), 711–729

work page 2014
[11]

Haddou, T

M. Haddou, T. Migot, J. Omer, A generalized direction in interior point method for monotone linear complementarity problems, Optim. Lett. 13 (2019), 35–53

work page 2019
[12]

Hastie , Ridge regularization: An essential concept in data science, Technometrics 62 (2020), 426–433

T. Hastie , Ridge regularization: An essential concept in data science, Technometrics 62 (2020), 426–433

work page 2020
[13]

Hastie, R

T. Hastie, R. Tibshirani, J. Friedman, The elements of statistical learning. Data mining, inference and prediction, Springer (New York, 2001)

work page 2001
[14]

R. W. Hoerl, Ridge regression: A historical context, Technometrics 62 (2020), 420–425

work page 2020
[15]

A. N. Iusem, An interior point method for the nonlinear complementarity problem, Appl. Numer. Math. 24 (1997), 469–482

work page 1997
[16]

Kanzow, A new approach to continuation methods for complementarity problems with uniform P -functions, Oper

C. Kanzow, A new approach to continuation methods for complementarity problems with uniform P -functions, Oper. Res. Lett. 20 (1997), 85–92

work page 1997
[17]

Kojima, N

M. Kojima, N. Megiddo, T. Noma, A. Yoshise, A unified approach to interior point algorithms for linear complementarity problems , Lecture Notes in Comput. Sci. 538, Springer (Berlin, 1991)

work page 1991
[18]

Kojimam S

M. Kojimam S. Shindo, Extension of Newton and quasi-Newton methods to systems of PC 1 equations, J. Oper. Res. Soc. Jpn. 29 (1986), 352–374

work page 1986
[19]

Li, An entropy–based aggregate method for minimax optimization, Eng

X. Li, An entropy–based aggregate method for minimax optimization, Eng. Opt. 18 (1992), 277–285

work page 1992
[20]

Y. Li, T. Tan, X. Li, A log-exponential smoothing method for mathematical programs with complementarity constraints, Appl. Math. Comput. 218(2012), 5900—5909. 18

work page 2012
[21]

T. L. Loi , Lojasiewicz inequalities in o-minimal structures, Manuscripta Math. 150 (2016), 59–72

work page 2016
[22]

Lotfi and H

T. Lotfi and H. Veiseh, A note on unique solvability of the absolute value equation, 2013

work page 2013
[23]

O. L. Mangasarian, RR. Meyer, Absolute value equations, Linear Algebra Appl. 419 (2006), 359–367

work page 2006
[24]

O. L. Mangasarian, Linear complementarity as absolute value equation solution, Optim. Lett. 8 (2014), 1529–1534

work page 2014
[25]

MATLAB R2023A, Natick, Massachusetts: The MathWorks Inc., 2010

work page 2010
[26]

Mor´e, Global methods for nonlinear complementarity problems, Math

J.-J. Mor´e, Global methods for nonlinear complementarity problems, Math. Oper. Res. 21 (1996), 589–614

work page 1996
[27]

Mor´e , W.C

J.-J. Mor´e , W.C. Rheinboldt, On P - and S- functions and related classes ofn- dimensional nonlinear mappings, Linear Algebra Appl. 6 (1973), 45–68

work page 1973
[28]

Nesterov, Smooth minimization of nonsmooth functions, Math

Y. Nesterov, Smooth minimization of nonsmooth functions, Math. Program. Ser. A 103 (2005), 127–152

work page 2005
[29]

F. A. Potra, Y. Ye, Interior-point methods for nonlinear complementarity problems, J. Optim. Theory Appl. 88(1996), 617–642

work page 1996
[30]

E. H. Osmani, M. Haddou, N. Bensalem, L. Abdallah, A new smoothing method for nonlinear complementarity problems involving P0-function. Stat. Optim. Inf. Comput. 10 (2022), 1267–1292

work page 2022
[31]

R. T. Rockafellar, J.-B. R. Wets, Variational analysis, Grundlehren Math. Wiss. 317, Springer (Berlin, 1998)

work page 1998
[32]

Prokopyev, On equivalent reformulations for absolute value equations, Comput

O. Prokopyev, On equivalent reformulations for absolute value equations, Comput. Optim. Appl. 44 (2009), 363–372

work page 2009
[33]

Rohn, A theorem of the alternatives for the equation ax + b|x| = b, Linear Mult

J. Rohn, A theorem of the alternatives for the equation ax + b|x| = b, Linear Mult. Algebra 52 (2004), 421–426

work page 2004
[34]

Rohn, On unique solvability of the absolute value equation, Optim

J. Rohn, On unique solvability of the absolute value equation, Optim. Lett. 3 (2009), 603–606

work page 2009
[35]

J. Rohn, V. Hooshyarbakhsh, and R. Farhadsefat, An iterative method for solving absolute value equations and sufficient conditions for unique solvability, Optim. Lett. 8 (2014), 35–44

work page 2014
[36]

Tibshirani, Regression shrinkage and selection via the lasso, J

R. Tibshirani, Regression shrinkage and selection via the lasso, J. Roy. Statist. Soc. Ser. B 58 (1996), 267–288

work page 1996
[37]

Wu and C.-X

S.-L. Wu and C.-X. Li, A note on unique solvability of the absolute value equation, Optim. Lett. 14 (2020), 1957–1960. 19 Aris Daniilidis, Tr´ ı Minh Lˆ e Institut f¨ ur Stochastik und Wirtschaftsmathematik, VADOR E105-04 TU Wien, Wiedner Hauptstraße 8, A-1040 Wien E-mail: {aris.daniilidis, minh.le }@tuwien.ac.at https://www.arisdaniilidis.at/ Research su...

work page 2020

[1] [1]

Abdallah, M

L. Abdallah, M. Haddou, T. Migot, Solving absolute value equation using complemen- tarity and smoothing functions. J. Comput. Appl. Math. 327 (2018), 196–207

work page 2018

[2] [2]

J. H. Alcantara, J-S. Chen. A new class of neural networks for NCPs using smooth per- turbations of the natural residual function, J. Comput. Appl. Math. 407 (2022), Paper No. 114092, 22 pp

work page 2022

[3] [3]

J. H. Alcantara, J.-S. Chen, M. K. Tam,Method of alternating projections for the general absolute value equation. J. Fixed Point Theory Appl. 25 (2023), Paper No. 39, 38 pp. 17

work page 2023

[4] [4]

Ben Gharbia J.C

I. Ben Gharbia J.C. Gilbert, Nonconvergence of the plain Newton-min algorithm for linear complementarity problems with a P-matrix, Mathematical Programming 134 (2012), 349–364

work page 2012

[5] [5]

J. Y. Bello Cruz, O. P. Ferreira, L. F. Prudente, On the global convergence of the inexact semi-smooth Newton method for absolute value equation, Comput. Optim. Appl. 65 (2016), 93–108

work page 2016

[6] [6]

Coste , An Introduction to o-minimal Geometry , Instituti Editoriali e Poligrafici Inter- nazionali, Pisa (2000)

M. Coste , An Introduction to o-minimal Geometry , Instituti Editoriali e Poligrafici Inter- nazionali, Pisa (2000)

work page 2000

[7] [7]

Dacunto, V

D. Dacunto, V. Grandjean, A gradient inequality at infinity for tame functions, Rev. Mat. Complut. 18 (2005), 493–501

work page 2005

[8] [8]

Fiedler, V

M. Fiedler, V. Pt ´ak, On matrices with nonpositive off-digagonal elements and positive principal minors, Czech. Math. J. 12 (1962), 382–400

work page 1962

[9] [9]

Hu and Z.-H

S.-L. Hu and Z.-H. Huang, A note on absolute value equations, Optim. Lett. 4 (2010), 417–424

work page 2010

[10] [10]

Haddou, P

M. Haddou, P. Maheux, Smoothing methods for nonlinear complementarity problems, J. Optim. Theory Appl. 160 (2014), 711–729

work page 2014

[11] [11]

Haddou, T

M. Haddou, T. Migot, J. Omer, A generalized direction in interior point method for monotone linear complementarity problems, Optim. Lett. 13 (2019), 35–53

work page 2019

[12] [12]

Hastie , Ridge regularization: An essential concept in data science, Technometrics 62 (2020), 426–433

T. Hastie , Ridge regularization: An essential concept in data science, Technometrics 62 (2020), 426–433

work page 2020

[13] [13]

Hastie, R

T. Hastie, R. Tibshirani, J. Friedman, The elements of statistical learning. Data mining, inference and prediction, Springer (New York, 2001)

work page 2001

[14] [14]

R. W. Hoerl, Ridge regression: A historical context, Technometrics 62 (2020), 420–425

work page 2020

[15] [15]

A. N. Iusem, An interior point method for the nonlinear complementarity problem, Appl. Numer. Math. 24 (1997), 469–482

work page 1997

[16] [16]

Kanzow, A new approach to continuation methods for complementarity problems with uniform P -functions, Oper

C. Kanzow, A new approach to continuation methods for complementarity problems with uniform P -functions, Oper. Res. Lett. 20 (1997), 85–92

work page 1997

[17] [17]

Kojima, N

M. Kojima, N. Megiddo, T. Noma, A. Yoshise, A unified approach to interior point algorithms for linear complementarity problems , Lecture Notes in Comput. Sci. 538, Springer (Berlin, 1991)

work page 1991

[18] [18]

Kojimam S

M. Kojimam S. Shindo, Extension of Newton and quasi-Newton methods to systems of PC 1 equations, J. Oper. Res. Soc. Jpn. 29 (1986), 352–374

work page 1986

[19] [19]

Li, An entropy–based aggregate method for minimax optimization, Eng

X. Li, An entropy–based aggregate method for minimax optimization, Eng. Opt. 18 (1992), 277–285

work page 1992

[20] [20]

Y. Li, T. Tan, X. Li, A log-exponential smoothing method for mathematical programs with complementarity constraints, Appl. Math. Comput. 218(2012), 5900—5909. 18

work page 2012

[21] [21]

T. L. Loi , Lojasiewicz inequalities in o-minimal structures, Manuscripta Math. 150 (2016), 59–72

work page 2016

[22] [22]

Lotfi and H

T. Lotfi and H. Veiseh, A note on unique solvability of the absolute value equation, 2013

work page 2013

[23] [23]

O. L. Mangasarian, RR. Meyer, Absolute value equations, Linear Algebra Appl. 419 (2006), 359–367

work page 2006

[24] [24]

O. L. Mangasarian, Linear complementarity as absolute value equation solution, Optim. Lett. 8 (2014), 1529–1534

work page 2014

[25] [25]

MATLAB R2023A, Natick, Massachusetts: The MathWorks Inc., 2010

work page 2010

[26] [26]

Mor´e, Global methods for nonlinear complementarity problems, Math

J.-J. Mor´e, Global methods for nonlinear complementarity problems, Math. Oper. Res. 21 (1996), 589–614

work page 1996

[27] [27]

Mor´e , W.C

J.-J. Mor´e , W.C. Rheinboldt, On P - and S- functions and related classes ofn- dimensional nonlinear mappings, Linear Algebra Appl. 6 (1973), 45–68

work page 1973

[28] [28]

Nesterov, Smooth minimization of nonsmooth functions, Math

Y. Nesterov, Smooth minimization of nonsmooth functions, Math. Program. Ser. A 103 (2005), 127–152

work page 2005

[29] [29]

F. A. Potra, Y. Ye, Interior-point methods for nonlinear complementarity problems, J. Optim. Theory Appl. 88(1996), 617–642

work page 1996

[30] [30]

E. H. Osmani, M. Haddou, N. Bensalem, L. Abdallah, A new smoothing method for nonlinear complementarity problems involving P0-function. Stat. Optim. Inf. Comput. 10 (2022), 1267–1292

work page 2022

[31] [31]

R. T. Rockafellar, J.-B. R. Wets, Variational analysis, Grundlehren Math. Wiss. 317, Springer (Berlin, 1998)

work page 1998

[32] [32]

Prokopyev, On equivalent reformulations for absolute value equations, Comput

O. Prokopyev, On equivalent reformulations for absolute value equations, Comput. Optim. Appl. 44 (2009), 363–372

work page 2009

[33] [33]

Rohn, A theorem of the alternatives for the equation ax + b|x| = b, Linear Mult

J. Rohn, A theorem of the alternatives for the equation ax + b|x| = b, Linear Mult. Algebra 52 (2004), 421–426

work page 2004

[34] [34]

Rohn, On unique solvability of the absolute value equation, Optim

J. Rohn, On unique solvability of the absolute value equation, Optim. Lett. 3 (2009), 603–606

work page 2009

[35] [35]

J. Rohn, V. Hooshyarbakhsh, and R. Farhadsefat, An iterative method for solving absolute value equations and sufficient conditions for unique solvability, Optim. Lett. 8 (2014), 35–44

work page 2014

[36] [36]

Tibshirani, Regression shrinkage and selection via the lasso, J

R. Tibshirani, Regression shrinkage and selection via the lasso, J. Roy. Statist. Soc. Ser. B 58 (1996), 267–288

work page 1996

[37] [37]

Wu and C.-X

S.-L. Wu and C.-X. Li, A note on unique solvability of the absolute value equation, Optim. Lett. 14 (2020), 1957–1960. 19 Aris Daniilidis, Tr´ ı Minh Lˆ e Institut f¨ ur Stochastik und Wirtschaftsmathematik, VADOR E105-04 TU Wien, Wiedner Hauptstraße 8, A-1040 Wien E-mail: {aris.daniilidis, minh.le }@tuwien.ac.at https://www.arisdaniilidis.at/ Research su...

work page 2020