A study of multivalent q-starlike functions connected with circular domain

Gautam Srivastava; Jin-Lin Liu; Lei Shi; Muhammad Arif; Qaiser Khan

arxiv: 1907.07827 · v1 · pith:D4XW4YRTnew · submitted 2019-07-18 · 🧮 math.CA · cs.DM

A study of multivalent q-starlike functions connected with circular domain

Lei Shi , Qaiser Khan , Gautam Srivastava , Jin-Lin Liu , Muhammad Arif This is my paper

Pith reviewed 2026-05-24 19:46 UTC · model grok-4.3

classification 🧮 math.CA cs.DM

keywords multivalent functionsq-starlike functionscircular domainconvolutioncoefficient estimatesFekete-Szego inequalitiesBernardi integral operatorq-calculus

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The pith

A new class of multivalent q-starlike functions tied to circular domains yields coefficient estimates and Fekete-Szego inequalities.

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

The paper defines a new subfamily of analytic multivalent q-starlike functions connected to a circular domain and studies its basic properties. It derives results on convolution, sufficiency criteria for class membership, bounds on Taylor coefficients, and Fekete-Szego type inequalities. The authors also introduce a q-extension of the Bernardi integral operator and examine its action on the new class. These steps extend classical techniques from geometric function theory into a q-calculus setting for multivalent mappings.

Core claim

The authors introduce the class of multivalent q-starlike functions associated with the circular domain and prove that functions in this class satisfy convolution closure properties under stated conditions, admit explicit sufficiency criteria, obey coefficient estimates obtained via subordination, and fulfill Fekete-Szego inequalities; they further define the q-Bernardi integral operator and establish its basic mapping properties for the class.

What carries the argument

The newly defined subfamily of multivalent q-starlike functions linked to the circular domain via a subordination condition, which enables direct application of standard coefficient and inequality techniques.

Load-bearing premise

The newly defined subfamily of multivalent q-starlike functions satisfies the analyticity and mapping conditions in the circular domain that permit direct application of standard subordination and coefficient techniques without additional restrictions or counterexamples.

What would settle it

A concrete analytic multivalent function that satisfies the defining subordination condition for the new class yet violates one of the stated coefficient bounds or Fekete-Szego inequalities would disprove the claims.

read the original abstract

In the present article, our aim is to examine some useful problems including the convolution problem, sufficiency criteria, coefficient estimates and Fekete-Szego type inequalities for a new subfamily of analytic and multivalent functions associated with circular domain. In addition, we also define and study a Bernardi integral operator in its $q$-extension for multivalent functions.

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

This paper adds a new multivalent q-starlike subclass tied to a circular domain and works out the usual coefficient and Fekete-Szego bounds plus a q-Bernardi operator, but the methods are routine extensions.

read the letter

This paper defines a new subfamily of multivalent q-starlike functions linked to a circular domain and then derives convolution properties, sufficiency criteria, coefficient estimates, Fekete-Szego inequalities, and a q-extension of the Bernardi integral operator. The main addition is the specific class definition in the q-setting, which lets them apply subordination and coefficient techniques to produce explicit bounds for that family. The operator part is a direct q-analogue of an existing construction. That fills a small gap in the literature for this combination of multivalence, q-calculus, and the circular domain condition. The work is competent at carrying out the standard program for such classes. The soft spots are that the techniques are the usual ones from prior q-starlike papers, so the results read as parameter adjustments rather than fresh methods or sharper bounds. The circular domain may not introduce substantial new restrictions or sharpness questions beyond what the q-parameter already controls, and the abstract gives no indication of comparisons that would show these estimates improve on earlier ones. No machine-checked proofs or independent verifications are mentioned, which is normal here but leaves the derivations to be checked by hand. This is for specialists already following q-geometric function theory and multivalent function classes. A reader outside that narrow track gets little. It deserves peer review because the claims are clearly stated, the program is well-posed, and the field routinely publishes these targeted extensions after referee checks on the calculations.

Referee Report

0 major / 2 minor

Summary. The manuscript defines a new subfamily of analytic multivalent q-starlike functions associated with a circular domain and investigates convolution problems, sufficiency criteria, coefficient estimates, Fekete-Szegő inequalities, and a q-analogue of the Bernardi integral operator.

Significance. If the class definition is consistent with the stated mapping properties and the derivations hold, the work provides incremental extensions of q-geometric function theory to the multivalent case in a circular domain, along with associated bounds and an integral operator. Such results can serve as references for further studies in q-calculus applications to analytic functions, though the contribution is primarily technical rather than foundational.

minor comments (2)

[Abstract] Abstract: the description of the circular domain and the precise role of the parameter q remain high-level; a brief indication of the defining subordination or analytic condition would improve clarity for readers.
The manuscript would benefit from an explicit statement of the radius of the circular domain and any restrictions on q to ensure the functions remain analytic and multivalent in the unit disk.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for reviewing the manuscript. The report summarizes the work but provides no specific major comments to address point by point. We note the uncertain recommendation and the characterization of the contribution as incremental; the paper aims to extend q-geometric function theory to the multivalent setting with a circular domain, including new results on convolutions, coefficients, Fekete-Szegő inequalities, and the q-Bernardi operator.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper introduces a new class of multivalent q-starlike functions tied to a circular domain and applies standard subordination and coefficient techniques to obtain convolution properties, sufficiency criteria, bounds, and a q-Bernardi operator. No quoted equations or derivation steps reduce any claimed prediction, bound, or result to the class definition by construction. No self-citation chains, imported uniqueness theorems, or ansatzes smuggled via prior work are indicated in the provided text. The work is a conventional incremental extension in geometric function theory whose central claims retain independent mathematical content beyond the initial definition.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract only; insufficient detail to enumerate specific free parameters, axioms, or invented entities beyond the general setting of q-calculus and multivalent analytic functions.

pith-pipeline@v0.9.0 · 5583 in / 1126 out tokens · 28531 ms · 2026-05-24T19:46:30.805333+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

37 extracted references · 37 canonical work pages

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Ahmad and M

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Aldweby and M

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Aldweby and M

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Aldawish and M

I. Aldawish and M. Darus, Starlikeness of q-diﬀerential operator involving quantum calculus, Korean Jour- nal of Mathematics , 22(4)(2014), 699 − 709

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Arif and B

M. Arif and B. Ahmad, New subfamily of meromorphic starli ke functions in circular domain involving q-diﬀerential operator, Mathematica Slovaca, 68(5)(18), 1049 − 1056

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M. Arif, J. Dziok, M. Raza and J. Sok´ o/suppress l, On products of multivalent close-to-star functions, Journal of Inequality and Applications , Volume 2015(2015): 5, 14 Pages

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M. Arif, M. Haq and J.-L. Liu, A subfamily of univalent fun ctions associated with q-analogue of Noor integral operator, Journal Function Spaces , 2018, Article ID 3818915, 5 pages

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M. Arif, H. M. Srivastava and S. Umar, Some applications of a q-analogue of the Ruscheweyh type operator for multivalent functions, Rev. Real Acad. Cienc. Exactas F ´ ıs. Natur. Ser. A Mat. (RACSAM ) 113 (2019), 1211-1221

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F. H. Jackson, On q-functions and a certain diﬀerence operator, Earth and Environmental Science Trans- actions of The Royal Society of Edinburgh , 46(2)(1909), 253 − 281

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F. H. Jackson, On q-deﬁnite integrals, The Quarterly Journal of Pure and Applied Mathematics , 41(1910), 193 − 203

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Kanas and D

S. Kanas and D. R˘ aducanu, Some class of analytic functi ons related to conic domains, Mathematica Slovaca, 64(5)(2014), 1183 − 1196

work page 2014
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F. R. Keogh and E. P. Merkes, A coeﬃcient inequality for c ertain classes of analytic functions, Proceedings of the American Mathematical Society , 20(1969), 8 − 12

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Mahmood, M

S. Mahmood, M. Arif and S. N. Malik, Janowski type close- to-convex functions associated with conic regions, Journal of Inequalities and Applications , Volume 2017 (2017): 259. DOI 10.1186/s13660-017-1535-4

work page doi:10.1186/s13660-017-1535-4 2017
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Mahmmod and J

S. Mahmmod and J. Sok´ o/suppress l, New subclass of analytic functions in conical domain associated with Ruscheweyh q-diﬀerential operator, Results in Mathematics , 71(4)(2017), 1345 − 1357

work page 2017
[21]

Mohammed and M

A. Mohammed and M. Darus, A generalized operator involv ing the q-hypergeometric function, Matematiˇ cki vesnik, 65(4)(2013), 454 − 465

work page 2013
[22]

K. I. Noor and M. Arif, On some applications of Ruschewey h derivative, Computers & Mathematics with Applications, 62(12)(2011), 4726 − 4732

work page 2011
[23]

Rogosinski, On the coeﬃcients of subordinate functi ons, Proceedings of the London Mathematical So- ciety, 48(2)(1943), 48 − 82

W. Rogosinski, On the coeﬃcients of subordinate functi ons, Proceedings of the London Mathematical So- ciety, 48(2)(1943), 48 − 82

work page 1943
[24]

Ruscheweyh, New criteria for univalent functions, Proceedings of the American Mathematical Society , 49(1975), 109 − 115

S. Ruscheweyh, New criteria for univalent functions, Proceedings of the American Mathematical Society , 49(1975), 109 − 115

work page 1975
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T. M. Seoudy and M. K. Aouf, Coeﬃcient estimates of new cl asses of q-starlike and q-convex functions of complex order, Journal of Mathematical Inequalities , 10(1)(2016), 135 − 145

work page 2016
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T. M. Seoudy and M. K. Aouf, Convolution properties for c ertain classes of analytic functions deﬁned by q-derivative operator, Abstract and Applied Analysis , 2014(2014), Article ID 846719, 7 pages

work page 2014
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Silverman, E

H. Silverman, E. M. Silvia and D. Telage, Convolution co nditions for convexity starlikeness and spiral- likness, Mathematiche Zeitschrift , 162(2) (1978) , 125 − 130

work page 1978
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Sok´ o/suppress l and D

J. Sok´ o/suppress l and D. K. Thomas, Ceﬃcient estimates in a class of strongly starlike functions, Kyungpook Math- ematics Journal, 49(2009), 349 − 353

work page 2009
[29]

H. M. Srivastava, Univalent functions, fractional cal culus, and associated generalized hypergeometric func- tions, in Univalent Functions, Fractional Calculus, and Their Applications (H. M. Srivastava and S. Owa, Editors), Halsted Press (Ellis Horwood Limited, Chicheste r), pp. 329–354, John Wiley and Sons, New York, Chichester, Brisbane and Toronto, 198...

work page 1989
[30]

H. M. Srivastava and D. Bansal, Close-to-convexity of a certain family of q-Mittag-Leﬄer functions, J. Nonlinear Var. Anal. 1(1)(2017), 61 − 69

work page 2017
[31]

Z. G. W ang, M. Raza, M. Ayaz and M. Arif, On certain multiv alent functions involving the generalized Srivastava-Attiya operator, Journal Nonlinear Sciences & Applications , 9(2016), 6067 − 6076

work page 2016
[32]

H. M. Srivastava, B. Khan, N. Khan and Q. Z. Ahmad, Coeﬀci ent inequalities for q-starlike functions associated with the Janowski functions, Hokkaido Math. J. 48 (2019), 407ˆ ae“425

work page 2019
[33]

Mahmood, Q

S. Mahmood, Q. Z. Ahmad, H. M. Srivastava, N. Khan, B. Kha n and M. Tahir, A certain subclass of meromorphically q-starlike functions associated with the Janowski function s, J. Inequal. Appl. 2019 (2019), Article ID 88, 1-11

work page 2019
[34]

H. M. Srivastava, Q. Z. Ahmad, N. Khan and B. Khan, Hankel and Toeplitz determinants for a subclass of q-starlike functions associated with a general conic domain , Mathematics 7 (2019), Article ID 181, 1-15

work page 2019
[35]

H. M. Srivastava, M. Tahir, B. Khan, Q. Z. Ahmad and N. Kha n, Some general classes of q-starlike functions associated with the Janowski functions, Symmetry 11 (2019), Article ID 292, 1-14

work page 2019
[36]

Mahmood, H

S. Mahmood, H. M. Srivastava, N. Khan, Q. Z. Ahmad, B. Kha n and I. Ali, Upper bound of the third Hankel determinant for a subclass of q-starlike functions, Symmetry 11 (2019), Article ID 347, 1-13

work page 2019
[37]

Mahmood, M

S. Mahmood, M. Jabeen, S. N. Malik, H. M. Srivastava, R. M anzoor and S. M. J. Riaz, Some coeﬃcient inequalities of q-starlike functions associated with conic domain deﬁned by q-derivative, J. Funct. Spaces 2018 (2018), Article ID 8492072, 1-13. 1School of Mathematics and Statistics, Anyang Normal Universit y, Anyan 455002, Henan, Peo- ple’s Republic of C...

work page 2018

[1] [1]

Agrawal and S

S. Agrawal and S. K. Sahoo, A generalization of starlike f unctions of order α, Hokkaido Mathematical Journal, 46(2017), 15 − 27

work page 2017

[2] [2]

Ahmad and M

B. Ahmad and M. Arif, New subfamily of meromorphic convex functions in circular domain involving q-operator, International Journal of Analysis and Applications, 16(1)(2018), 75 − 82

work page 2018

[3] [3]

O. P. Ahuja, Families of analytic functions related to Ru scheweyh derivatives and subordinate to convex functions. Yokohama Mathematical Journal, 41(1)(1993), 39 − 50

work page 1993

[4] [4]

Aldweby and M

H. Aldweby and M. Darus, A subclass of harmonic univalent functions associated with q-analogue of Dziok- Srivastava operator, ISRN Mathematical Analysis , Volume 2013, Article ID 382312, 6 pages

work page 2013

[5] [5]

Aldweby and M

H. Aldweby and M. Darus, Some subordination results on q-analogue of Ruscheweyh diﬀerential operator, Abstract and Applied Analysis , Volume 2014, Article ID 958563, 6 pages

work page 2014

[6] [6]

Aldawish and M

I. Aldawish and M. Darus, Starlikeness of q-diﬀerential operator involving quantum calculus, Korean Jour- nal of Mathematics , 22(4)(2014), 699 − 709

work page 2014

[7] [7]

Arif and B

M. Arif and B. Ahmad, New subfamily of meromorphic starli ke functions in circular domain involving q-diﬀerential operator, Mathematica Slovaca, 68(5)(18), 1049 − 1056

work page

[8] [8]

M. Arif, J. Dziok, M. Raza and J. Sok´ o/suppress l, On products of multivalent close-to-star functions, Journal of Inequality and Applications , Volume 2015(2015): 5, 14 Pages

work page 2015

[9] [9]

M. Arif, M. Haq and J.-L. Liu, A subfamily of univalent fun ctions associated with q-analogue of Noor integral operator, Journal Function Spaces , 2018, Article ID 3818915, 5 pages

work page 2018

[10] [10]

M. Arif, H. M. Srivastava and S. Umar, Some applications of a q-analogue of the Ruscheweyh type operator for multivalent functions, Rev. Real Acad. Cienc. Exactas F ´ ıs. Natur. Ser. A Mat. (RACSAM ) 113 (2019), 1211-1221

work page 2019

[11] [11]

S. D. Bernardi, Convex and starlike univalent function s, Transactions American Mathematical Society , 135(1969), 429 − 446

work page 1969

[12] [12]

R. M. Goel and N. S. Sohi, A new criterion for p-valent functions, Proceedings of the American Mathematical Society, 78(3)(1980), 353 − 357

work page 1980

[13] [13]

M. E. H. Ismail, E. Merkes and D. Styer, A generalization of starlike functions, Complex Variables, Theory and Applications , 14(1990), 77 − 84

work page 1990

[14] [14]

F. H. Jackson, On q-functions and a certain diﬀerence operator, Earth and Environmental Science Trans- actions of The Royal Society of Edinburgh , 46(2)(1909), 253 − 281

work page 1909

[15] [15]

F. H. Jackson, On q-deﬁnite integrals, The Quarterly Journal of Pure and Applied Mathematics , 41(1910), 193 − 203

work page 1910

[16] [16]

Janowski, Some extremal problems for certain famili es of analytic functions, Annales Polonici Mathe- matici, 28(1973), 297 − 326

W. Janowski, Some extremal problems for certain famili es of analytic functions, Annales Polonici Mathe- matici, 28(1973), 297 − 326

work page 1973

[17] [17]

Kanas and D

S. Kanas and D. R˘ aducanu, Some class of analytic functi ons related to conic domains, Mathematica Slovaca, 64(5)(2014), 1183 − 1196

work page 2014

[18] [18]

F. R. Keogh and E. P. Merkes, A coeﬃcient inequality for c ertain classes of analytic functions, Proceedings of the American Mathematical Society , 20(1969), 8 − 12

work page 1969

[19] [19]

Mahmood, M

S. Mahmood, M. Arif and S. N. Malik, Janowski type close- to-convex functions associated with conic regions, Journal of Inequalities and Applications , Volume 2017 (2017): 259. DOI 10.1186/s13660-017-1535-4

work page doi:10.1186/s13660-017-1535-4 2017

[20] [20]

Mahmmod and J

S. Mahmmod and J. Sok´ o/suppress l, New subclass of analytic functions in conical domain associated with Ruscheweyh q-diﬀerential operator, Results in Mathematics , 71(4)(2017), 1345 − 1357

work page 2017

[21] [21]

Mohammed and M

A. Mohammed and M. Darus, A generalized operator involv ing the q-hypergeometric function, Matematiˇ cki vesnik, 65(4)(2013), 454 − 465

work page 2013

[22] [22]

K. I. Noor and M. Arif, On some applications of Ruschewey h derivative, Computers & Mathematics with Applications, 62(12)(2011), 4726 − 4732

work page 2011

[23] [23]

Rogosinski, On the coeﬃcients of subordinate functi ons, Proceedings of the London Mathematical So- ciety, 48(2)(1943), 48 − 82

W. Rogosinski, On the coeﬃcients of subordinate functi ons, Proceedings of the London Mathematical So- ciety, 48(2)(1943), 48 − 82

work page 1943

[24] [24]

Ruscheweyh, New criteria for univalent functions, Proceedings of the American Mathematical Society , 49(1975), 109 − 115

S. Ruscheweyh, New criteria for univalent functions, Proceedings of the American Mathematical Society , 49(1975), 109 − 115

work page 1975

[25] [25]

T. M. Seoudy and M. K. Aouf, Coeﬃcient estimates of new cl asses of q-starlike and q-convex functions of complex order, Journal of Mathematical Inequalities , 10(1)(2016), 135 − 145

work page 2016

[26] [26]

T. M. Seoudy and M. K. Aouf, Convolution properties for c ertain classes of analytic functions deﬁned by q-derivative operator, Abstract and Applied Analysis , 2014(2014), Article ID 846719, 7 pages

work page 2014

[27] [27]

Silverman, E

H. Silverman, E. M. Silvia and D. Telage, Convolution co nditions for convexity starlikeness and spiral- likness, Mathematiche Zeitschrift , 162(2) (1978) , 125 − 130

work page 1978

[28] [28]

Sok´ o/suppress l and D

J. Sok´ o/suppress l and D. K. Thomas, Ceﬃcient estimates in a class of strongly starlike functions, Kyungpook Math- ematics Journal, 49(2009), 349 − 353

work page 2009

[29] [29]

H. M. Srivastava, Univalent functions, fractional cal culus, and associated generalized hypergeometric func- tions, in Univalent Functions, Fractional Calculus, and Their Applications (H. M. Srivastava and S. Owa, Editors), Halsted Press (Ellis Horwood Limited, Chicheste r), pp. 329–354, John Wiley and Sons, New York, Chichester, Brisbane and Toronto, 198...

work page 1989

[30] [30]

H. M. Srivastava and D. Bansal, Close-to-convexity of a certain family of q-Mittag-Leﬄer functions, J. Nonlinear Var. Anal. 1(1)(2017), 61 − 69

work page 2017

[31] [31]

Z. G. W ang, M. Raza, M. Ayaz and M. Arif, On certain multiv alent functions involving the generalized Srivastava-Attiya operator, Journal Nonlinear Sciences & Applications , 9(2016), 6067 − 6076

work page 2016

[32] [32]

H. M. Srivastava, B. Khan, N. Khan and Q. Z. Ahmad, Coeﬀci ent inequalities for q-starlike functions associated with the Janowski functions, Hokkaido Math. J. 48 (2019), 407ˆ ae“425

work page 2019

[33] [33]

Mahmood, Q

S. Mahmood, Q. Z. Ahmad, H. M. Srivastava, N. Khan, B. Kha n and M. Tahir, A certain subclass of meromorphically q-starlike functions associated with the Janowski function s, J. Inequal. Appl. 2019 (2019), Article ID 88, 1-11

work page 2019

[34] [34]

H. M. Srivastava, Q. Z. Ahmad, N. Khan and B. Khan, Hankel and Toeplitz determinants for a subclass of q-starlike functions associated with a general conic domain , Mathematics 7 (2019), Article ID 181, 1-15

work page 2019

[35] [35]

H. M. Srivastava, M. Tahir, B. Khan, Q. Z. Ahmad and N. Kha n, Some general classes of q-starlike functions associated with the Janowski functions, Symmetry 11 (2019), Article ID 292, 1-14

work page 2019

[36] [36]

Mahmood, H

S. Mahmood, H. M. Srivastava, N. Khan, Q. Z. Ahmad, B. Kha n and I. Ali, Upper bound of the third Hankel determinant for a subclass of q-starlike functions, Symmetry 11 (2019), Article ID 347, 1-13

work page 2019

[37] [37]

Mahmood, M

S. Mahmood, M. Jabeen, S. N. Malik, H. M. Srivastava, R. M anzoor and S. M. J. Riaz, Some coeﬃcient inequalities of q-starlike functions associated with conic domain deﬁned by q-derivative, J. Funct. Spaces 2018 (2018), Article ID 8492072, 1-13. 1School of Mathematics and Statistics, Anyang Normal Universit y, Anyan 455002, Henan, Peo- ple’s Republic of C...

work page 2018