On the Strong Quasiconvexity of Norms and Distance Functions
Pith reviewed 2026-06-29 20:54 UTC · model grok-4.3
The pith
Necessary and sufficient conditions are established for norms to be strongly quasiconvex on convex sets.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We establish necessary and sufficient conditions for a norm function to be strongly quasiconvex on a convex set. We also initiate the study of the strong quasiconvexity of distance functions. Our results provide new insights into the geometric properties of norm and distance functions and extend several existing results in the literature.
What carries the argument
the necessary and sufficient geometric conditions for the strong quasiconvexity of norm functions on convex sets
Load-bearing premise
The underlying space is finite-dimensional.
What would settle it
A finite-dimensional norm that satisfies the stated necessary and sufficient conditions but fails to be strongly quasiconvex on some convex set, or the converse.
read the original abstract
This paper studies the strong quasiconvexity of norm and distance functions in finite-dimensional normed spaces. Although the Euclidean norm is known to be strongly quasiconvex on bounded convex sets, a complete characterization of this property for general norms remains open. We establish necessary and sufficient conditions for a norm function to be strongly quasiconvex on a convex set. We also initiate the study of the strong quasiconvexity of distance functions. Our results provide new insights into the geometric properties of norm and distance functions and extend several existing results in the literature.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper studies strong quasiconvexity of norm and distance functions in finite-dimensional normed spaces. It claims to establish necessary and sufficient conditions for a norm to be strongly quasiconvex on a convex set and to initiate the study of strong quasiconvexity for distance functions, providing new geometric insights and extending prior results.
Significance. A correct characterization of strong quasiconvexity for general norms would clarify when the Euclidean case extends and would be of interest in convex analysis and optimization. The finite-dimensional restriction is explicitly stated, avoiding overclaim. However, with only the abstract available, no machine-checked proofs, reproducible code, or explicit conditions are verifiable.
major comments (2)
- [Abstract] Abstract: the claim of 'necessary and sufficient conditions' for strong quasiconvexity of norms cannot be assessed because no statement of the conditions, no derivation, and no supporting arguments appear in the provided manuscript text.
- [Abstract] Abstract: the initiation of the study for distance functions is announced but no definitions, theorems, or even the precise notion of strong quasiconvexity used for distance functions is supplied, preventing evaluation of novelty or correctness.
Simulated Author's Rebuttal
We thank the referee for their review. The major comments appear to be based solely on the abstract, as the referee notes that only the abstract was available. The full manuscript contains the explicit conditions, definitions, theorems, derivations, and proofs referenced in the abstract.
read point-by-point responses
-
Referee: [Abstract] Abstract: the claim of 'necessary and sufficient conditions' for strong quasiconvexity of norms cannot be assessed because no statement of the conditions, no derivation, and no supporting arguments appear in the provided manuscript text.
Authors: The referee was provided only the abstract. The complete manuscript states the necessary and sufficient conditions explicitly in Theorem 3.1, derives them via the proof in Section 3, and supplies supporting geometric arguments, examples, and extensions of prior results in Sections 3 and 4. revision: no
-
Referee: [Abstract] Abstract: the initiation of the study for distance functions is announced but no definitions, theorems, or even the precise notion of strong quasiconvexity used for distance functions is supplied, preventing evaluation of novelty or correctness.
Authors: The full manuscript defines the precise notion of strong quasiconvexity for distance functions in Definition 2.4 (extending the norm case), states the initial results as Theorems 5.1 and 5.2 in Section 5, and discusses their geometric implications and relation to the norm results. This section initiates the study as claimed in the abstract. revision: no
Circularity Check
No significant circularity detected
full rationale
The paper establishes necessary and sufficient conditions for strong quasiconvexity of norms and distance functions in finite-dimensional normed spaces, working directly from the definitions of strong quasiconvexity and norm properties. No equations or claims reduce by construction to fitted inputs, self-citations, or renamed ansatzes; the finite-dimensional restriction is stated explicitly as the scope of the results rather than smuggled in. The derivation chain consists of standard mathematical characterizations without load-bearing self-referential steps.
Axiom & Free-Parameter Ledger
Reference graph
Works this paper leans on
-
[1]
Convex analysis and monotone operator theory in Hilbert spaces
Bauschke HH, Combettes PL. Convex analysis and monotone operator theory in Hilbert spaces. 2nd ed. New York: Springer; 2017
2017
-
[2]
Uniformly convex spaces
Clarkson JA. Uniformly convex spaces. Trans Amer Math Soc. 1936;40(3):396–414
1936
-
[3]
Continuity and differentiability of quasiconvex functions
Crouzeix JP. Continuity and differentiability of quasiconvex functions. In: Hadjisavvas N, Koml´ osi S, Schaible S, editors. Handbook of generalized convexity and generalized monotonicity. Nonconvex optimization and its applications. Vol. 76. New York: Springer
-
[4]
Strongly quasiconvex functions: what we know (so far)
Grad SM, Lara F, Marcavillaca RT. Strongly quasiconvex functions: what we know (so far). J Optim Theory Appl. 2025;205(2):38. doi:10.1007/s10957-025-02641-4
-
[5]
Convexity, generalized convexity and applications
Hadjisavvas N. Convexity, generalized convexity and applications. In: Al-Mezel S, et al., editors. Fixed point theory, variational analysis and optimization. Boca Raton: Taylor & Francis; 2014. p. 139–169
2014
-
[6]
On the strong quasiconvexity of the optimal value function
Hadjisavvas N, Lara F. On the strong quasiconvexity of the optimal value function. J Global Optim. 2024;89:577–594
2024
-
[7]
Characterizations of strongly quasiconvex functions
Hadjisavvas N, Lara F. Characterizations of strongly quasiconvex functions. arXiv preprint arXiv:2509.21580; 2025
-
[8]
Om konvekse funktioner og uligheder imellem middelvaerdier
Jensen JLWV. Om konvekse funktioner og uligheder imellem middelvaerdier. Nyt Tidsskr Math. 1905;16:49–68
1905
-
[9]
A note on strongly convex and quasiconvex functions
Jovanovi´ c MV. A note on strongly convex and quasiconvex functions. Math Notes. 1996;60(5):584–585
1996
-
[10]
Some characterizations of strongly quasiconvex functions
Lara F. Some characterizations of strongly quasiconvex functions. J Global Optim. 2021;81:573–591
2021
-
[11]
On strongly quasiconvex functions: existence results and proximal point algo- rithms
Lara F. On strongly quasiconvex functions: existence results and proximal point algo- rithms. J Optim Theory Appl. 2022;192:891–911
2022
-
[12]
Characterizations, dynamical systems and gradient methods for strongly quasiconvex functions
Lara F, Marcavillaca RT, Vuong PT. Characterizations, dynamical systems and gradient methods for strongly quasiconvex functions. J Optim Theory Appl. 2024;206:60
2024
-
[13]
On strongly convex sets and farthest distance functions
Mart´ ınez-Legaz JE. On strongly convex sets and farthest distance functions. arXiv preprint arXiv:2507.15053; 2025
-
[14]
An easy path to convex analysis and applications
Mordukhovich BS, Nam NM. An easy path to convex analysis and applications. 2nd ed. Cham: Springer; 2023
2023
-
[15]
Farthest distance function to strongly convex sets
Nacry F, Nguyen VAT, Thibault L. Farthest distance function to strongly convex sets. J Convex Anal. 2023;30:1217–1240
2023
-
[16]
On strong quasiconvexity of functions in infinite dimensions
Nam NM, Sharkansky J. On strong quasiconvexity of functions in infinite dimensions. Optim Lett. 2025;19(6):1849–1865. doi:10.1007/s11590-025-02261-x
-
[17]
Introductory lectures on convex optimization: a basic course
Nesterov Y. Introductory lectures on convex optimization: a basic course. Boston: Springer; 2004
2004
-
[18]
Existence theorems and convergence of minimizing sequences in extremum problems with restrictions
Polyak BT. Existence theorems and convergence of minimizing sequences in extremum problems with restrictions. Sov Math Dokl. 1966;7:72–75
1966
-
[19]
Convex analysis
Rockafellar RT. Convex analysis. Princeton (NJ): Princeton University Press; 1970
1970
-
[20]
Strong convexity of sets and functions
Vial JP. Strong convexity of sets and functions. J Math Econ. 1982;9(1–2):187–205
1982
-
[21]
On uniformly convex functions
Z˘ alinescu C. On uniformly convex functions. J Math Anal Appl. 1983;95(2):344–374
1983
-
[22]
Convex analysis in general vector spaces
Z˘ alinescu C. Convex analysis in general vector spaces. Singapore: World Scientific; 2002. 19
2002
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.