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M. Aigner, A Course in Enumeration, book>

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Various editors, On Certain L-Functions, book>

B. Barik, Lucas sequence, its properties and generalization, thesis>

P. Barry, A Study of Integer Sequences, Riordan Arrays, Pascal-like Arrays and Hankel Transforms, thesis>

BassoNardon, Brownian motion, Dept. of Applied Mathematics University Ca’ Foscari Venice, nat>

BOOK REVIEWS BROTHER ALFRED BROUSSEAU, workshop

N. T. Cameron. Combinatorics with the Riordan Group, lect>

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S. Cooper, The q-binomial theorem, lect>

C. Corsani, D. Merlini, R. Sprugnoli, Left-inversion of combinatorial sums, article>

D. Damanik and A. Pushmitski&B. Simon, The Analytic Theory of Matrix Orthogonal Polynomials, book>

Various authors, Elliptic Curves, Modular Forms, and Fermat’s Last Theorem, book>

P. J. Davis, Circulant Matrices, book>

A. Di Bucchianico, An introduction to Umbral Calculus, lect>

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T. Ernst, The history of q-calculus and a new method, book>

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N. Freitas, L-functions and Elliptic Curves, lect>

C. Furst, Combinatorial Sums: Egorychev’s method of coefficients and Riordan arraysthesis>

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H. Hida, Modular Forms, Congruences and L-Values, course>

M. Hirvensalo and N. Gogin, Generating Function of Discrete Chebyshev Polynomials, book>

D. Husemöller, Elliptic Curve, book>

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M. Ismail and E. Koelik, In Memoriam: Mizan Rahman, article>

J. Kaczorowsk and A. Perelli, An Ω-result for the difference of the coefficients of two L-functions, article>

T. Karadag, Modular forms and L-functions, lecture>

J. Karlsson, Modular forms and converse theorems for Dirichlet series, thesis>

K. Kedlaya, L-functions and modular forms, Workshop organized by K. Kedlaya et al., lect>

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R. Koekoek, Generalizations of the classical Laguerre polynomials and some q-analogues, thesis>

R. Koekoek, P. A. Lesky and R. F. Swarttouw, Hypergeometric Orthogonal Polynomials and their q-analoguesbook>

R. Koekoek and P. A. Lesky&R. F. Swarttouw, Hypergeometric Orthogonal Polynomials and their q-analoguesbook>

R. Koekoek and R. F. Swarttouw, The Askey-scheme of hypergeometric orthogonal polynomials and its q-analoguebook>

T. H. Koornwinder, Orthogonal Polynomials, lect>

T. H. Koornwinder, Askey­Wilson polynomial, article>

S. Khrushchev, Orthogonal polynomials and continued fractions from Euler’s point of view, book>

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J-M. Leahy, An introduction to Tate’s Thesis, thesis>

A. F. S. Loureiro, Hahn's generalised problem and corresponding Appell polynomial sequences, thesis>

L. Lovász and K. Vesztergombi, Discrete Mathematics,  notes>

W. Luo, Wiener Chaos Expansion and Numerical Solution of Stoch. Parti Diff. Equations, thesis>

J.C. Mason and D.C. Handscomb, Chebyshev Polynomials, book>

A.M. Meinke, Fibonacci numbers and associated matrices, thesis>

D. Merlini, R. Sprugnoli, M.C. Verri, Combinatorial sums and implicit Riordan arrays, article>

D. Merlini, A Survey on Riordan Arrays, lect>

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D. Poularikas, book>

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D. Ramakrishnan and R. J. Valenza, Fourier analysis on number fields, book>

R. C. Rhoades, Elliptic curves and modular forms, lect>

R. Schwartz, Notes on Fourier Series and Modular Forms, notes>

L. Shapiro, A Survey of the Riordan Grouplect

J.H. Silverman, An Introduction to the Theory of Elliptic Curves, lect>

J. Steuding, An Introduction to the Theory of L-functions, notes

S. Szegö, Orthogonal Polynomials, book>

J. Tate, Introduction to L-functions I, Fourier Analysis in Number Fields and Hecke’s Zeta functions, reprinted in the book of Cassels and Frohlich,  Algebraic Number Theory, Academic Press (1967), book>

J. Tsimerman, Analytic Theory of Modular Forms, Spring 2012, lect>

E. Ullmo, Modular Forms and Modular Curves, Aug 26, 2006, notes>

J. Urbanowicz and K. S. Williams, Congruences for L-Functions, book>

xxxx,Wiener Measure and Brownian Motion, book>

A.Wyn-jones, Circulants, book>

H. Zassenhaus, Emil Artin, his life and his work, article>

Zlotnik and M. Jardak, Polynomial Chaos for Dynamical Systemsnotes