Pages that link to "Item:Q4369686"
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The following pages link to On perfect powers in products with terms from arithmetic progressions (Q4369686):
Displaying 23 items.
- On products of disjoint blocks of arithmetic progressions and related equations (Q271755) (← links)
- Almost fifth powers in arithmetic progression (Q555292) (← links)
- Perfect powers in products of arithmetical progressions with fixed initial term (Q675791) (← links)
- Almost perfect powers in consecutive integers. II (Q735435) (← links)
- On the product of consecutive elements of an arithmetic progression (Q1068877) (← links)
- On sets of integers whose shifted products are powers (Q2427559) (← links)
- Almost squares in arithmetic progression. III (Q2486116) (← links)
- Almost perfect powers in arithmetic progression (Q2759139) (← links)
- A note on the product of consecutive elements of an arithmetic progression (Q2770798) (← links)
- Power values of sums of products of consecutive integers (Q2804246) (← links)
- On the size of sets whose elements have perfect power \(n\)-shifted products (Q2898839) (← links)
- Perfect powers from products of consecutive terms in arithmetic progression (Q3393907) (← links)
- Note on the paper ``An extension of a theorem of Euler" by Hirata-Kohno et al. (Acta Arith. 129 (2007), 71–102) (Q3530812) (← links)
- Perfect powers in products of terms in an arithmetical progression. II (Q3993979) (← links)
- On arithmetic progressions of equal lengthsand equal products of terms (Q4369682) (← links)
- (Q5188087) (← links)
- Powers in products of terms of Pell's and Pell–Lucas Sequences (Q5253883) (← links)
- On the equation n(n+d)⋅⋅⋅(n+(i<sub>0</sub>-1)d)(n+(i<sub>0</sub>+1)d)⋅⋅⋅(n+(k-1)d)=y<sup>l</sup>with 0<i<sub>0</sub><k-1 (Q5310174) (← links)
- Perfect Powers in Products with Consecutive Terms from Arithmetic Progressions, II (Q5416081) (← links)
- Arithmetic progressions with common difference divisible by small primes (Q5445014) (← links)
- (Q5477814) (← links)
- On a problem of Erdős and Graham (Q5892373) (← links)
- The Diophantine equation f(x)=g(y)$f(x)=g(y)$ for polynomials with simple rational roots (Q6176480) (← links)
