IE School of Science and Technology’s Post

Mathematics is at the core of everything, from science to telecommunications. This is why Eva Gallardo, President of the Real Sociedad Matemática Española (Royal Society of Mathematics), believes that it is essential for students to understand the discipline to create innovation in other areas. Listen to what she had to say about the importance of mathematics in our Chat with Experts series! Learn more about the Bachelor in Applied Mathematics here: https://bit.ly/3Vc3m4O

"Progress in mathematics it's not about results of your operations, it's about the process and understanding, and to understand you need to get involved." We met with Eduardo Sáenz de Cabezón, Ph.D. in Mathematics and Professor at the University of La Rioja in Spain, to discuss his view on the mathematics world. Being determined and curious, wanting to increase your knowledge and love the power of abstract thinking is key to comprehending mathematics. Listen to what he has to say below! Learn more about our Bachelor in Applied Mathematics: https://lnkd.in/dEXSNX_3

The true meaning of mathematics lies in attempting to solve challenging problems, which are the essence of mathematics in life. In the summer of 1900, an international mathematics conference was held in Paris, which remains timeless due to the lecture given by the young achiever of that era, Hilbert. Boldly, he identified what he believed to be the 23 most important problems for mathematicians to solve, attempting to outline the mathematics of the 20th century, successfully achieving this goal. Hilbert's problems defined the era of modern mathematics, most of which were resolved, with one notable exception: the Riemann Hypothesis, the eighth problem on Hilbert's list. It posits that the non-trivial zeros of the Riemann zeta function all lie on the critical line with the equation R(s) = 1/2. Over a century of attempts to solve the Riemann Hypothesis, the closest proof relies on Hilbert's Polya conjecture, suggesting that the non-trivial zeros of the Riemann zeta function are eigenvalues of a certain Hermitian operator. This forms the basis of our future research publications.

Exciting developments in the world of mathematics! A recent blog post highlights a groundbreaking discovery by mathematicians who have identified a new way for spheres to "kiss." This innovative approach not only expands our understanding of geometric interactions but also has potential implications in various scientific fields. To delve deeper into the details of this fascinating topic, I encourage you to read the full article here: https://ift.tt/NXZ8mPR.

Excited to share a thought-provoking new blog post that delves into the extraordinary mind of Srinivasa Ramanujan, one of history's greatest mathematicians. This article explores how contemporary mathematics continues to uncover the depths of his genius and the profound impact of his work on modern mathematical theory. Discover the intriguing connections and ongoing developments that highlight Ramanujan's lasting legacy in the field of mathematics. Read the full article here: https://ift.tt/NHtCRul

📚🔍 Languages are more than words—they’re a strategic asset for identity and development. This #InternationalTranslationDay, step into the shoes of Leibniz with Professor McMillan and discover how one of the founders of calculus aimed to revolutionize mathematical thought with a universal encyclopedia of knowledge. READ Leibniz’s Lost Language – ‘Characteristica Geometrica’ and the Symbolic Art of Mathematics at https://lnkd.in/gN3af3HY

Lucía Martín-Merchán, a postdoctoral researcher in University of Waterloo Faculty of Mathematics, has disproved a 30-year-old conjecture in pure mathematics. Experts believed 7D shapes called G₂ manifolds had a specific feature—but Lucía proved otherwise. Her groundbreaking work reveals that these shapes do not exhibit a property long thought to define them, challenging decades of theoretical assumptions. 🔗Read more: https://bit.ly/40YYvZg #GRADImpact

Lucía Martín-Merchán's work in disproving a decades-old conjecture is a testament to the profound impact of fundamental research in mathematics. Her success with G2 manifolds challenges us to reconsider the boundaries of our understanding, even in realms as abstract as seven-dimensional spaces. As a proud alumnus of the University of Waterloo with a background in Management Sciences, I deeply appreciate the interdisciplinary curiosity that fuels discoveries like this. Martín-Merchán’s analogy of exploring new planets through mathematical abstraction resonates with the spirit of pushing intellectual frontiers, a value shared by many in academic and professional fields. This achievement also reinforces the importance of collaborative environments in academia. It’s a reminder that even the most abstract research can one day lead to insights with wide-reaching implications.

Exciting developments in the world of mathematics have unfolded over the past year, showcasing innovative breakthroughs and insights. Our latest blog post provides an in-depth exploration of these advancements, highlighting key achievements and their potential implications for the future of math. Dive into the most significant trends and discoveries that have shaped 2024 in mathematics. Read the full article here: https://ift.tt/msayToL

Our paper has been accepted for publication in Applied Mathematics in Science and Engineering (SCIE, Q2). In Geometric Function Theory, different subclasses of analytic and bi-univalent functions have been investigating and studying involving different orthogonal q-polynomials. In our paper, we firstly defined new subclasses of q-bi-starlike functions by making use of q-derivative operator which involves the generalized q-Lommel polynomials and q-Chebyshev polynomials, and then we obtained initial coefficients bounds along with the Fekete-Szegö inequalities.