- IRREDUCIBILITY OF GENERALIZED HERMITE-LAGUERRE POLYNOMIALS
- GRIMM'S CONJECTURE AND SMOOTH NUMBERS SHANTA LAISHRAM AND M. RAM MURTY
- Some Topics in Number Theory (Refinements, Extensions and Generalisations of a Theorem
- Topics in Diophantine Equations A thesis by
- Extensions of Schur's irreducibility results Shanta Laishram and T. N. Shorey
- Indag. Mathem., N.S., 20 (3), 427434 September, 2009 Irreducibility of generalized HermiteLaguerre Polynomials II
- Journal of Combinatorics and Number Theory JCNT 2009, Volume 1, Issue # 3, pp. 65-73
- SQUARES IN PRODUCTS IN ARITHMETIC PROGRESSION WITH AT MOST ONE TERM OMITTED AND COMMON DIFFERENCE A PRIME
- SQUARES IN PRODUCTS IN ARITHMETIC PROGRESSION WITH AT MOST TWO TERMS OMITTED AND COMMON DIFFERENCE A
- AN EXTENSION OF A THEOREM OF EULER NORIKO HIRATA-KOHNO, SHANTA LAISHRAM, T. N. SHOREY, AND R. TIJDEMAN
- THE GREATEST PRIME DIVISOR OF A PRODUCT OF CONSECUTIVE INTEGERS
- ACTA ARITHMETICA 113.4 (2004)
- Indag. Matbem., N.S., 17 (3), 425--436 September 25, 2006 The greatest prime divisor of a product of terms in an arithmetic
- International Journal of Number Theory Vol. 2, No. 2 (2006) 207211
- AN ESTIMATE FOR THE LENGTH OF AN ARITHMETIC PROGRESSION THE PRODUCT OF WHOSE TERMS IS ALMOST SQUARE
- International Journal of Number Theory Vol. 6, No. 8 (2010) 18691873
- THE SUM OF DIGITS OF n AND n2 KEVIN G. HARE, SHANTA LAISHRAM, AND THOMAS STOLL
- Some irreducibility results for truncated binomial expansions
- Indag. Mathem., N.S., 15 (4), 505-521 December 20, 2004 Number of prime divisors in a product of terms of an arithmetic
- This is a free offprint provided to the author by the publisher. Copyright restrictions may apply. PROCEEDINGS OF THE
- THE EQUATION n(n + d) (n + (k -1)d) = by2 WITH (d) 6 OR d 1010
