On some diophantine inequalities involving primes
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- (log N ) H y - i Proof . By Abel’s lemma we have, for all real 8 )
- (log N ) “ X Hx- l 3)
- Jou rn al für M ath em atik . Bd. 22.S 22 B a k e r , On some diophantine inequalities involving primes
- 4) Verified as in the proof of Lemma 7; see also earlier footnote.
- ( 3 6 - /7 ) (3 6 -7 7 ) | S ( a b j q , k) \ (log k) 8 N) * , B a k e r
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| b | (log N ) Hy which are obviously valid if | fi j <; (log N ^ N * 1. Lemma 2. Suppose that N > (16 B ) A (log A )4H. Then i (7) / | / ( M ) 7 ( M ) /(M > (log A T 2*. (log N ) H y - i Proof. By Abel’s lemma we have, for all real <%, ( 8 ) 2( Thus for /? in the interval (log N ) HN 1 iS /9 iS (2 B 1 we obtain | /(¿>,/9) | < /? ’. Hence th e contribution of this interval to the num ber on the left of (7) is a t m ost Q O J f}~ 3 d(i = -t 7V2(log iV)* (log N ) “ X ' Hx- l 3) This can be written in the alternative form p(k)g>(q)l(p(k), where k = ql(m^q); see G. H. Hardy and E. M . Wright, An introduction to the theory of numbers (Oxford, 1960), Theorem 272, p. 238. s d e i r n j 1 We now consider th e interval (2 B) 1 For each such ß there exists a i * _i pair of relatively prime integers a, q w ith 1 <1 a ^ q ^ N 2 such th a t | qß — a | < N K Suppose first th a t q > B. Then q cannot divide bj and thus abj = k }q + lj for / = 1, 2 , 3, where k h lf are integers w ith 1 < q. It follows th a t ¿>¿/8— k j = || || > (2 g )-1; for clearly r — k j — Ijlq + (bjß - kj - Ij/^ g - ^ l - BN~%) > (2 1 and similarly 1 — (b}ß — k ß > (2q)~\ Since q ^ N 2, we see th a t (8) implies th a t the integrand on th e left of (7) is a t most (2iV2)3 ^ i . V 2(logiV )-2". 1 The p a th of integration has length a t m ost and thu s the num ber on the right exceeds the contribution to the integral of those ß for which q > B. Now suppose th a t q B. Then noting th a t (61? 62, bß = 1, we obtain as above | I (b}ß) | < 2q <; 2 B for one at least of th e integers / = 1, 2, 3. Thus the integrand on th e left of (7) does not exceed 2 B N 2. F urther, the path of integration over those ß for which q jB has length a t most 2 2 2 q~1N~*<. 2 B N ~ i l^q^B a — 1 Combining our results we see th a t th e num ber on th e left of (7) does not exceed - |iV 2(logiV )-2" + 4 B * № < iV2(log iV)~2H, and this proves Lem m a 2. Lem m a 3. Suppose that (9) { (8 //)-4log i V p > B . 1 Let m be art integer such that \ m \ <^-prNB K Then ‘ d ^j - ; j (10) I j e(— > ( 6 B 2) - 2N 2(log N ) ~3 | 3R j where c5 > 0 depends only on H. ' ~ ; : , ‘ ■ - ■ _ j * - • ' j j Proof. We note first th a t the hypothesis of Lemma 2 is satisfied; for we have N = e>°*y > ((877)!)-1 (log N ) s" and (log iV)4H' > (8 For * on 4 write U(x) = e(— oi m) ¡J S(bj*), V ( c x ) = CQ(bß (1 ; = 1 Jou rn al für M ath em atik . Bd. 22.S 22 B a k e r , On some diophantine inequalities involving primes 169 where /} = oc — a/q. From Lem ma 1, noting th a t Cq(bp 5S min ( also (8) we obtain | U(oc) — V(oc) | < c6(m in (iV/log N , | 0 I"1))2 where c6 depends only on H. The integral of the squared factor on the right over | p | < (log N ) HN ~ l, indeed over all p from — oo to oo, does not exceed 4iV/log N. Hence 170 B a k e r , On some diophantine inequalities involving primes 1 f {U(x) — 7(*)} doc II a = 1 J («*, 0 - i matq < c7B N 2(log N) ~H, where c7 depends only on H . We consider the integral over V ( 1 1 with the interval — p is less th an A A i { B { y ( q ) ) - ' N 3(log iV)-2H} ^ 2 £ iV 2(log N Y 11. Thus th e num ber on th e left of (10) differs from (11) M m ) | 2 f J 7 C ,( ^ ) ) l^q^(logX)H 0 = 1 by Jess th an c8B N 2(log N) ~H, where co(m) = j e(— Pm) I I I(bj P)dp and c8 depends only On H. Clearly v(m) > co(m) > (log iV)“ 3 r(m ), where v(m) denotes th e num ber of integers mx, m2, m3 between 2 and N inclusive satisfying th e equation b1m 1 + b2m 2 + b3m 2 = m. Since v(m) is trivially less th an N 2 we see th a t the error introduced by summing over all positive integers q in (11) is less th an N 2B 3 2 (< p (q ))~ 2< c9 -V2 (log JV )"K v . q > ( \ o g X ) H i' The num ber on the left of (10) therefore differs from a>(m)(&(m) by at m ost the second term on the right of (10). I t rem ains only to prove th a t v(m) > ( 6 B 2)~2N 2. L et b = ( \ b1 \J b2) so th a t &3) = 1. Since N > (16jB)4 it is easily verified th a t there are a t least (6 B 2)~~1N integers k w ith — 2 N ( 3 B ) ~ 1 ^ k ^ — N ( 3 B ) - 1 — 2 B I such th a t kb = m (m o d & 3). By virtue of th e hypothesis \ m \ < ~ ^ N jB“ 1, the integer o m 2 for which kb J- m 2b3 = m clearly satisfies 2 <[ m3 N. Similarly for each k there 4) Verified as in the proof of Lemma 7; see also earlier footnote. are at least ( 6 B 2)~l N integers m l such th a t 2 N ( 3 B ) ~ 1 + 2 N B ~ l and m 1b1 + m 2b2 = kb, where m 2 is an integer satisfying 2 This gives the required estim ate for v(m) and completes the proof of th e lemma. Lemma 4. Suppose that h > 1. Let oc be a real number for which relatively prime integers a, q exist such that (12) | qx — a | < (log N ) hfN, (log N ) h N j (log O-A) Then both S(x) and I (oc) have absolute values not exceeding c10N (log N) 2 , where c10 depends only on h. Proof. The result for S(x) is due to Vinogradov; for a proof see, for example, P rachar [3], Satz 6. 1, p. 189. Our estim ate follows im m ediately from this on noting th a t (q-i + qiy-i) l < 2 (log N )~^and < A !(lo g iV ft To obtain th e result for I (x) we use th e estim ate | | || [|-1 given by (8). h The inequalities (12) imply th a t | | * | | > (log N) ~N~l provided N exceeds a suitable num ber depending only on h\ for otherwise the nearest integer b to oc would satisfy \ qb — a \ <: q( log N ) * N - X + (log N ) hN ^ ^ (log N)~* + (log N ) hN ~ \ The num ber on th e right tends to zero as N tends to infinity bu t th a t on the left is a non zero integer and th us a t least 1. Hence the required inequality for || oc || holds if N is sufficiently large. For the rem aining N we use the trivial estim ate | I(oc) | lemma follows easily. Lem ma 5, Suppose that (9) holds. Then for all oc on m we have (36- H ) (13) ! S ( b}oc) I < cn B N (log N) 8 (/ = 2, 3), where cn depends only on H. Proof. We write S ( x , k ) = £ e(ocp) ' v p prim e \ ■: • so th a t S(oc, N) = iS'fa), It suffices to prove (13) for / = 1 since the proof for j = 2 or 3 is similar. If oc is on m there exist relatively prime integers a, q such th a t (12) holds w ith h = H. Let d == (q, | bx |) and let q = dqx, a | bx | = dax so th a t (a1, qx) = 1. Since d ^ I I ^ B < (log N ) 2 > we have (log N ) 2 < qx < N /(log N ) 2 , and th us if k is JL 1L 1L any integer satisfying N /[log N ) 4 1 applying Lem ma 4 w ith h, oc, N, a, q replaced by ~^H, a bj q, k, ax, q1 respectively we obtain ( 3 6 - /7 ) (3 6 -7 7 ) | S ( a b j q , k) \ < c12k (log k) 8 < c12iV(log N) * , B a k e r , On some diophantine inequalities involving primes 171 22 * // where c12 depends only on H. If A; is a positive integer not exceeding AT/(log iV )4 the result holds trivially. Now from the equation S ( b xa) = * 2 S ( a b J q , k) {e(bxfik) - e ( b j \ k + 1))} + S (ab1lq)e(bi p N ) y where /? = a — a/gr, it follows th a t (3 6 - H ) I S {bt*) | < c13N (log N) * ( N B | p | + 1) where c13 depends only on / / , and this gives (13) since N | /3 | < 1. 1 Lemma 6. Suppose that m is an integer such that | m | ^ B and @(m) > —. Then Ji for any d > 0 there is a number c14, depending only on d, such that (5) possesses a solution in primes p x, p 2, p 2 each less than cf*. Proof. We begin by defining H = 120 ([¿_1] + 1). Let c15 = c5 + cn + 1, where c5 and cn denote the num bers which appear in Lemmas 3 and 5. Then c15 depends only on <5. Define N to be th e least positive integer satisfying (14) {(8/7)~4 log iV}^ > c15B 7. Clearly N is less th an c**, where c14 is a num ber depending only on d. F urther, (14) implies th a t N > H > 100 and 11-2 log N > (8H )AB H > 2 log (3B) ^ log ( 3 B | m |). Thus th e hypotheses of Lemma 3 are satisfied. We proceed to prove th a t (5) possesses a Solution w ith primes p ^ p ^ P ^ not exceeding N. L et U [a) be defined as in the proof of Lemma 3. The num ber of solutions of (5) in primes p Xl p 2, p 3 not exceeding N is clearly given by I -f / , where I = f U(a)da, J = f U(a)da. W m From Lem m a 5 we see th a t Yüklə 0,9 Mb. Dostları ilə paylaş:
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