- The generalised Ramanujan-Nagell equation T.N. Shorey
- SQUARES IN PRODUCTS IN ARITHMETIC PROGRESSION WITH AT MOST ONE TERM OMITTED
- On an equation of Goormaghtigh, II YANN BUGEAUD (Strasbourg) & T. N. SHOREY (Mumbai)
- On the equation x(x + 1) (x + k 1) = y(y + d) (y + (mk 1)d); m = 1; 2
- On the maximal length of two sequences of integers in arithmetic progressions with the same prime divisors
- Perfect powers in products of terms in an arithmetical progression (III)
- Extensions of Schur's irreducibility results Shanta Laishram and T. N. Shorey
- PRIME FACTORS OF ARITHMETIC PROGRESSIONS AND BINOMIAL COEFFICIENTS
- Transcendental In nite Sums S.D. Adhikari, N. Saradha, T.N. Shorey and R. Tijdeman
- Number of prime divisors in a product of terms of an arithmetic progression
- Some conjectures in the theory of exponential diophantine equations
- NUMBER OF PRIME DIVISORS IN A PRODUCT OF CONSECUTIVE INTEGERS
- Almost perfect powers in consecutive integers G. Hanrot, N. Saradha and T.N. Shorey
- Squares in products from a block of consecutive integers
- Approximations of algebraic numbers by rationals: A theorem of Thue
- The equation x n 1 = y q with x square
- Diophantine equations with products of consecutive terms in Lucas sequences II
- The equation a x n 1 x 1 = by q with ab > 1
- An Equation of Goormaghtigh and Diophantine Approximations 1
- On the equation n(n + d) (n + (i 0 -1)d)(n + (i 0 + 1)d) (n + (k -1)d) = y # with
- Diophantine equations with products of consecutive terms in Lucas sequences F. Luca and T.N. Shorey
- A Panorama in Number Theory The View from Baker's Garden
- Perfect powers in products of integers from a block of consecutive integers (II)
- Contributions towards a conjecture of Erdos on perfect powers in arithmetic progression
- DIOPHANTINE APPROXIMATIONS, DIOPHANTINE EQUATIONS, TRANSCENDENCE AND APPLICATIONS
- Exponential diophantine equations involving products of consecutive
- Irreducibility of polynomials and arithmetic progressions with equal
- Theorems of Sylvester and Schur T.N. Shorey
- ACTA ARITHMETICA Almost perfect powers in arithmetic progression
- ACTA ARITHMETICA Some extensions and refinements
- The equation x n 1 = y q has no solution with x square
- IRRATIONALITY CRITERIA FOR NUMBERS OF MAHLER'S TYPE
- Almost squares and factorisations in consecutive integers
- THE GREATEST PRIME DIVISOR OF A PRODUCT OF CONSECUTIVE INTEGERS
- Powers in arithmetic progress (III) T.N. Shorey
- GRIMM'S CONJECTURE ON CONSECUTIVE INTEGERS SHANTA LAISHRAM AND T. N. SHOREY
- Square free part of products of consecutive integers
- Powers in arithmetic progressions (II) T.N. Shorey
- On values of a polynomial at arithmetic progressions with equal products
- On an equation of Goormaghtigh Yu. V. Nesterenko and T.N. Shorey
- Almost squares in arithmetic progression (III) Anirban Mukhopadhyay and T. N. Shorey
- THE GREATEST PRIME DIVISOR OF A PRODUCT OF TERMS IN AN ARITHMETIC PROGRESSION
- Almost squares in arithmetic progression N. Saradha and T.N. Shorey
- AN EXTENSION OF A THEOREM OF EULER NORIKO HIRATA-KOHNO, SHANTA LAISHRAM, T. N. SHOREY, AND R. TIJDEMAN
- DIVISIBILITY PROPERTIES OF HYPERGEOMETRIC POLYNOMIALS
- Products of Fibonacci numbers with indices in an interval and at most four omitted being a
- IRREDUCIBILITY OF GENERALIZED HERMITE-LAGUERRE POLYNOMIALS
- Indag. Mathem., N.S., 20 (2), 217-231 Divisibility properties of generalized Laguerre polynomials
- THE NUMBER OF PRIME DIVISORS OF A PRODUCT OF CONSECUTIVE INTEGERS
- Products of members of Lucas sequences with indices in an interval being a power
- SOME TOPICS IN PRIME NUMBER THEORY T. N. SHOREY
- THE EQUATION n(n + d) (n + (k -1)d) = by2 WITH (d) 6
- Almost squares in arithmetic progression (II) Anirban Mukhopadhyay and T. N. Shorey
