Selffertilization in Campanula rotundifolia L. s. 1. group
نویسندگان
چکیده
منابع مشابه
Metabolic pathways of benzimidazole anthelmintics in harebell (Campanula rotundifolia).
Benzimidazoles anthelmintics, which enter into environment primarily through excretion in the feces or urine of treated animals, can affect various organisms and disrupt ecosystem balance. The present study was designed to test the phytotoxicity and biotransformation of the three benzimidazole anthelmintics albendazole (ABZ), fenbendazole (FBZ) and flubendazole (FLU) in the harebell (Campanula ...
متن کاملNew microsatellite markers for Campanula scheuchzeri (Campanulaceae), with cross-amplification in C. rotundifolia1
PREMISE OF THE STUDY We developed new microsatellite primers for the alpine bellflower Campanula scheuchzeri. Allelic polymorphisms will be used to study differentiation along elevation gradients of C. scheuchzeri populations and in the co-occurring sister-species C. rotundifolia in the Alps. METHODS AND RESULTS We analyzed C. scheuchzeri from three high-elevation sites and C. rotundifolia fr...
متن کامل1 CP violation in Bd,s → l + l −
The FCNC process B d,s → ll has been shown in recent years to be a powerful process to shed light on new physics beyond SM [1,2,3,4,5] especially for SUSY models which may enhance the decay amplitude by tan β [1,6,2,3], provided that tanβ is large (say, ≥ 20). It became more interesting recently after the Brookhaven National Laboratory (BNL) reported the 2σ excess of the muon anomalous magnetic...
متن کامل1 7 Ju l 2 00 6 LENGTH - BASED CRYPTANALYSIS : THE CASE OF THOMPSON ’ S GROUP
The length-based approach is a heuristic for solving randomly generated equations in groups which possess a reasonably behaved length function. We describe several improvements of the previously suggested length-based algorithms, that make them applicable to Thompson’s group with significant success rates. In particular, this shows that the Shpilrain-Ushakov public key cryptosystem based on Tho...
متن کاملNonvanishing of L - functions on < ( s ) = 1
In [Ja-Sh], Jacquet and Shalika use the spectral theory of Eisenstein series to establish a new result concerning the nonvanishing of L-functions on <(s) = 1. Specifically they show that the standard L-function L(s, π) of an automorphic cusp form π on GLm is nonzero for <(s) = 1. We analyze this method, make it effective and also compare it with the more standard methods. This note is based on ...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
ژورنال
عنوان ژورنال: Acta Societatis Botanicorum Poloniae
سال: 2015
ISSN: 2083-9480
DOI: 10.5586/asbp.1973.019