F
Feng Bao
Researcher at Soochow University (Suzhou)
Publications - 347
Citations - 9554
Feng Bao is an academic researcher from Soochow University (Suzhou). The author has contributed to research in topics: Encryption & Digital signature. The author has an hindex of 47, co-authored 346 publications receiving 8907 citations. Previous affiliations of Feng Bao include Gunma University & National University of Singapore.
Papers
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Journal ArticleDOI
Large-scale aqueous synthesis of fluorescent and biocompatible silicon nanoparticles and their use as highly photostable biological probes.
Yiling Zhong,Fei Peng,Feng Bao,Siyi Wang,Xiaoyuan Ji,Liu Yang,Yuanyuan Su,Shuit-Tong Lee,Yao He +8 more
TL;DR: A large-scale synthetic strategy is developed for facile one-pot aqueous synthesis of silicon nanoparticles (SiNPs) yielding SiNPs that feature strong fluorescence, favorable biocompatibility, and robust photo- and pH-stability.
Journal ArticleDOI
Quasicubic α-Fe2O3 Nanoparticles with Excellent Catalytic Performance
Yuanhui Zheng,Yao Cheng,Yuansheng Wang,Feng Bao,Lihua Zhou,Xiaofeng Wei,Yingying Zhang,Qi Zheng +7 more
TL;DR: In this article, a uniform quasicubic α-Fe2O3 nanoparticles enclosed by six identical {110} planes were synthesized by a simple solvothermal method.
Proceedings ArticleDOI
Efficient and practical fair exchange protocols with off-line TTP
TL;DR: The protocols presented here are the first exchange protocols which use offline TTP and at the same time guarantee true fair exchange of digital messages and introduce a novel cryptographic primitive, called the Certificate of Encrypted Message Being a Signature (CEMBS), as the basic building block of the fair exchange protocols.
BookDOI
Public Key Cryptography – PKC 2004
TL;DR: An extension of Wiener’s attack on small RSA secret decryption exponents finds p and q in polynomial time for every (N, e) satisfying ex + y = 0 mod φ(N) with.
Book ChapterDOI
Variations of Diffie-Hellman Problem
TL;DR: All three variations of computational Diffie-Hellman problem: square Diffie’s Hellman problem, inverse diffie- hellman problem and divisiblediffie-hellman problem are equivalent with optimal reduction, according to the argument DDH \(\Leftarrow\) SDDH.